Need to answer this algebraically and sketch a graph of the function.
2007-12-11 13:12:07 · 2 answers · asked by fixitman 3 in Education & Reference ➔ Homework Help
If you are assuming that f(x) is a second order equation (i.e. a parabola), then your general form is going to be y = ax^2 + bx + c. The trick here is to find a, b, and c.
We have zeros - at x > 9/2, we know that the function is negative. But right at 9/2, we can assume that the function is 0, and at x < 9/2 the function is positive. Likewise for x < -1. So we can use 9/2 and -1 as our x-intercepts. So, we have the following:
0 = a(9/2)^2 + b(9/2) + c
0 = (81/4)a + (9/2)b + c
0 = a(-1)^2 + b(-1) + c
0 = -a - b + c
We also have a point at (1, 28) given from the problem. So,
28 = a(1)^2 + b(1) + c
28 = a + b + c
Three equations and three unknowns - we can solve this now. If we added the second and third equations, the a and b terms cancel out, and we can solve for c:
(0 = -a - b + c) + (28 = a + b + c) = (28 = 2c)
c = 14
From here, we can plug into another equation, solve for a (or b), substitute that into the remaining equation, and solve for b (or a). Let's use the second equation first:
0 = -a - b + 14
a = 14 - b
Plug this into the first equation:
0 = (81/4)(14 - b) + (9/2)b + 14
0 = (567/2) - (81/4)b + (9/2)b + 14
0 = (595/2) - (63/4)b
(63/4)b = (595/2)
b = 1190/63
b = 170/9
And finally, we can solve for a:
a = 14 - (170/9)
a = -44/9
The answer for a makes sense, since the parabola points down. The negative values are right of 9/2 and left of -1 - the positive values are between the numbers, which means the vertex is positive as well.
So your equation then is y = -(44/9)x^2 + (170/9)x + 14. Again, this assumes a parabolic equation - if it were anything else, like a fourth degree equation, you have many more variables to deal with.
2007-12-12 05:56:51 · answer #1 · answered by igorotboy 7 · 0⤊ 0⤋
The x-intercepts of applications, if any exist, are generally harder to discover than the y-intercept, as finding the y intercept is composed of only comparing the function at x=0. i think of u r finding for the fee of x coz y is given....once you're saying y intercept the the fee of x is 0 (0, fee of y) or ( 0, -5)
2016-12-10 20:17:10 · answer #2 · answered by ? 4 · 0⤊ 0⤋